Advanced Algebra Chapter 9

1. Advanced Algebra Chapter 9 Rational Equations and Functions

2. Inverse and Joint Variation—9.1

3. Direct Variation • Two variables x and y vary directly iff: • If x and y vary directly and y=6 when x=3, write the general direct variation equation

4. Inverse Variation • x and y vary inversely if they are related by: • k is our constant of variation

5. Direct or Inverse? • How do we tell the difference? • Direct: • Constant and x are multiplied • Inverse: • Constant is divided by x • x is the denominator

6. Writing Equations • x and y vary inversely, and y=6 and x=1.5 • Find y when

7. Joint Variation • When a quantity varies directly as the product of two or more other variables • However, there are other possibilities of joint variation

8. Variation y varies directly with x Y varies inversely with x

9. Variation z varies jointly with x and y y varies inversely with the square of x

10. Variation z varies directly with y and inversely with x y varies inversely with x and z

11. p.537#21-24, 29-31, 35-36, 39-40, 45-47

12. Graphing Simple Rational Functions—9.2

13. Domain and Range • Domain: Any and all numbers that can be plugged into a function • X-values • Range: All output values of a function • Y-values

14. Rational Functions • Any function composed of the quotient of two functions

15. Graphing Rational Functions

16. Hyperbolas • The x-axis is the horizontal asymptote • The y-axis is the verticalasymptote • Domain: All values except 0 • Range: All values except 0 • Contains two symmetrical parts called branches

17. Hyperbolas--Shifting • All functions in the form are hyperbolas • Vertical asymptote at: • Horizontal asymptote at:

18. Graphing

19. Graphing

20. Other Hyperbolas • All functions of form are also hyperbolas • Vertical asymptote: • Horizontal asymptote:

21. Graphing

22. Graphing

23. p.543#12-18 Even, 26, 27, 35, 36

24. Graphing Other Rational Functions—9.3

25. Graphs of Rational Functions • The graph of the of the functionhas the following: • The x-intercepts of the graph are the real zeros of • The vertical asymptote occurs at each real zero of

26. Graphs of Rational Functions • The graph of the of the functionhas the following: • The graph has at most 1 horizontal asymptote • If , the line is the hor. asym. • If , the line is the hor. asym. • If , the graph has no hor. asym. The graph’s end behavior is that of the line:

27. Graphing

28. Graphing

29. Graphing

30. p.550#23-31

31. Multiplying and Dividing Rational Expressions—9.4

32. Rational Expressions • A rational expression is in simplest form iff the numerator and denominator share no common factors (other than 1)

33. Simplifying Expressions • Two Step process • Factor the numerator and denominator completely • Divide out any common factors

34. Simplifying Expressions

35. Simplifying Expressions

36. Simplifying Expressions

37. Simplifying Expressions

38. Simplifying Expressions

39. Simplifying Expressions

40. Simplifying Expressions

41. Simplifying Expressions

42. Simplifying Expressions

43. p.558#16-18, 28, 30, 36, 37, 44,45

44. Addition, Subtraction, and Complex Fractions—9.5

45. Addition and Subtraction • With any fraction… • When adding or subtracting must have a common denominator • Example:

46. Addition and Subtraction

47. Addition and Subtraction

48. Addition and Subtraction

49. Addition and Subtraction

50. Addition and Subtraction